On a property of the nodal set of least energy sign-changing solutions for quasilinear elliptic equations

Abstract

In this note we prove the Payne-type conjecture about the behaviour of the nodal set of least energy sign-changing solutions for the equation -p u = f(u) in bounded Steiner symmetric domains ⊂ RN under the zero Dirichlet boundary conditions. The nonlinearity f is assumed to be either superlinear or resonant. In the latter case, least energy sign-changing solutions are second eigenfunctions of the zero Dirichlet p-Laplacian in . We show that the nodal set of any least energy sign-changing solution intersects the boundary of . The proof is based on a moving polarization argument.